| Quellcodebibliothek Statistik Leitseite products/sources/formale Sprachen/PVS/orders/ (Beweissystem der NASA Version 6.0.9©) Datei vom 28.9.2014 mit Größe 4 kB |
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Quelle complementary_lattices.prf Sprache: Lisp |
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(complementary_lattices
(dual_dual 0 (dual_dual-1 nil 3318702826 ("" (skolem!) (("" (decompose-equality) (("" (expand* "dual" "o") (("" (rewrite "complement_complement") (("" (rewrite "complement_complement") nil nil)) nil)) nil)) nil)) nil) ((dual const-decl "[T -> T]" complementary_lattices nil) (boolean nonempty-type-decl nil booleans nil) (bool nonempty-type-eq-decl nil booleans nil) (pred type-eq-decl nil defined_types nil) (complement? const-decl "bool" complementary_orders nil) (lattice? const-decl "bool" bounded_orders nil) (<= formal-const-decl "(lattice?[T])" complementary_lattices nil) (T formal-nonempty-type-decl nil complementary_lattices nil) (complement_complement formula-decl nil complementary_orders nil) (O const-decl "T3" function_props nil)) shostak)) (dual_inclusion1 0 (dual_inclusion1-1 nil 3318704200 ("" (skolem!) (("" (expand* "dual" "o") (("" (lemma "le_complement") (("" (inst - "<=" "C!1(t!1)" "H!1(C!1(t!1))" "C!1") (("" (rewrite "complement_complement") (("" (prop) nil nil)) nil)) nil)) nil)) nil)) nil) ((O const-decl "T3" function_props nil) (dual const-decl "[T -> T]" complementary_lattices nil) (boolean nonempty-type-decl nil booleans nil) (bool nonempty-type-eq-decl nil booleans nil) (pred type-eq-decl nil defined_types nil) (lattice? const-decl "bool" bounded_orders nil) (<= formal-const-decl "(lattice?[T])" complementary_lattices nil) (complement? const-decl "bool" complementary_orders nil) (complement_complement formula-decl nil complementary_orders nil) (le_complement formula-decl nil complementary_orders nil) (T formal-nonempty-type-decl nil complementary_lattices nil)) shostak)) (dual_inclusion2 0 (dual_inclusion2-1 nil 3318704371 ("" (skolem!) (("" (expand* "dual" "o") (("" (lemma "le_complement") (("" (inst - "<=" "H!1(C!1(t!1))" "C!1(t!1)" "C!1") (("" (rewrite "complement_complement") (("" (prop) nil nil)) nil)) nil)) nil)) nil)) nil) ((O const-decl "T3" function_props nil) (dual const-decl "[T -> T]" complementary_lattices nil) (boolean nonempty-type-decl nil booleans nil) (bool nonempty-type-eq-decl nil booleans nil) (pred type-eq-decl nil defined_types nil) (lattice? const-decl "bool" bounded_orders nil) (<= formal-const-decl "(lattice?[T])" complementary_lattices nil) (complement? const-decl "bool" complementary_orders nil) (complement_complement formula-decl nil complementary_orders nil) (le_complement formula-decl nil complementary_orders nil) (T formal-nonempty-type-decl nil complementary_lattices nil)) shostak)) (dual_inclusion3 0 (dual_inclusion3-1 nil 3318704401 ("" (skolem!) (("" (expand* "dual" "o") (("" (lemma "le_complement") (("" (inst - "<=" "t!1" "H!1(t!1)" "C!1") (("" (rewrite "complement_complement") (("" (prop) nil nil)) nil)) nil)) nil)) nil)) nil) ((O const-decl "T3" function_props nil) (dual const-decl "[T -> T]" complementary_lattices nil) (boolean nonempty-type-decl nil booleans nil) (bool nonempty-type-eq-decl nil booleans nil) (pred type-eq-decl nil defined_types nil) (lattice? const-decl "bool" bounded_orders nil) (<= formal-const-decl "(lattice?[T])" complementary_lattices nil) (complement? const-decl "bool" complementary_orders nil) (complement_complement formula-decl nil complementary_orders nil) (le_complement formula-decl nil complementary_orders nil) (T formal-nonempty-type-decl nil complementary_lattices nil)) shostak)) (dual_inclusion4 0 (dual_inclusion4-1 nil 3318704698 ("" (skolem!) (("" (expand* "dual" "o") (("" (lemma "le_complement") (("" (inst - "<=" "H!1(t!1)" "t!1" "C!1") (("" (rewrite "complement_complement") (("" (prop) nil nil)) nil)) nil)) nil)) nil)) nil) ((O const-decl "T3" function_props nil) (dual const-decl "[T -> T]" complementary_lattices nil) (boolean nonempty-type-decl nil booleans nil) (bool nonempty-type-eq-decl nil booleans nil) (pred type-eq-decl nil defined_types nil) (lattice? const-decl "bool" bounded_orders nil) (<= formal-const-decl "(lattice?[T])" complementary_lattices nil) (complement? const-decl "bool" complementary_orders nil) (complement_complement formula-decl nil complementary_orders nil) (le_complement formula-decl nil complementary_orders nil) (T formal-nonempty-type-decl nil complementary_lattices nil)) shostak))) ¤ Dauer der Verarbeitung: 0.24 Sekunden (vorverarbeitet) ¤*© Formatika GbR, Deutschland |
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2026-03-28